\begin{tabular}{l}
\text{\LARGE{Uniform distribution}}\\
\\\hline\\
\text{The continuous uniform distribution is a probability distribution in which}\\
\text{the probability density is equal and greater than zero in the given interval}\\
\text{and equal to zero outside this interval.}
\\\\\hline\\
\text{\Large{Input parameters}}\\
    \begin{array}{ll}\\
    \\a & \text{left boundary of the interval}\\
    \\b & \text{right boundary of the interval}\\
    \end{array}
\\\\\hline\\
\text{\Large{Output parameters}}\\
    \begin{array}{ll}\\
    \\\text{Expected value} & \mathbf{\frac{a+b}{2}}\\
    \\\text{Standard deviation} & \mathbf{\sqrt{\frac{\left(b-a\right)^2}{12}}}\\
    \\\text{Variance} & \mathbf{\frac{\left(b-a\right)^2}{12}}\\
    \end{array}
\\\\\hline\\
\text{\Large{Additional information}}\\
    \begin{array}{ll}\\
    \\\text{Probability density function} & \mathbf{\left\{
        \begin{array}{cl}
            \frac{1}{b-a} & \mbox{ for }a\leq x\leq b \\
            0 & \text{otherwise}
        \end{array}
    \right.}\\
    \\\text{Moment-generating function} & \mathbf{\frac{e^{tb}-e^{ta}}{t\left(b-a\right)}}\\
    \end{array}
\end{tabular}